Gok, IsmailCamci, CetinHacisalihoglu, H. Hilmi2025-01-272025-01-2720091331-0623https://hdl.handle.net/20.500.12428/29021In this paper, we give a definition of harmonic curvature functions in terms of V-n and we define a new kind of a slant helix. We call this new slant helix a V-n-slant helix in n-dimensional Euclidean space En and define it by using new harmonic curvature functions. We also de fine a vector field D which we call a Darboux vector field of a Vn-slant helix in n-dimensional Euclidean space En and we give a new characterization as: alpha : I subset of R -> E-n is a V-n-slant helix <-> Hn-2*' - k1H(n-3)* = 0, where Hn-2*, Hn-3* are harmonic curvature functions and k(1) shows the first curvature function of the curve alpha.eninfo:eu-repo/semantics/closedAccessslant helicesharmonic curvature functionsEuclidean n-spaceArticle142317329N/AWOS:0002725912000142-s2.0-74549168392Q3